A double reflection over the \( x \)-axis and \( y \)-axis is the same as a \( \square \) of \( \square \)

A double reflection over the \( x \)-axis and \( y \)-axis can be visualized as first flipping a figure upside down over the \( x \)-axis and then flipping it again side to side over the \( y \)-axis. When you do this, you effectively end up rotating the figure 180 degrees about the origin. It’s like taking a piece of paper, flipping it over twice, and seeing how it lands—upside down and backward! This concept is foundational in geometry, especially in transformations. It helps us understand symmetry, congruence, and the coordinates of transformations in a fun, interactive way. In computer graphics, for instance, this understanding allows for complex animations and designs by applying these transformations efficiently, making shapes dance across the screen!